Markov additive process
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In applied probability, a Markov additive process (MAP) is a bivariate Markov process where the future states depends only on one of the variables.[1]
Contents
Definition
Finite or countable state space for J(t)
The process {(X(t),J(t)) : t ≥ 0} is a Markov additive process with continuous time parameter t if[1]
- {(X(t),J(t)) : t ≥ 0} is a Markov process
- the conditional distribution of (X(t + s) − X(t),J(s + t)) given (X(t),J(t)) depends only on J(t).
The state space of the process is R × S where X(t) takes real values and J(t) takes values in some countable set S.
General state space for J(t)
For the case where J(t) takes a more general state space the evolution of X(t) is governed by J(t) in the sense that for any f and g we require[2]
-
![\mathbb E[f(X_{t+s}-X_t)g(J_{t+s})|\mathcal F_t] = \mathbb E_{J_t,0}[f(X_s)g(J_s)]](/w/images/math/c/e/c/cecad59ecb3557d9bc820aa450a1e6f9.png)
.
Example
A fluid queue is a Markov additive process where J(t) is a continuous-time Markov chain.
Applications
Çinlar uses the unique structure of the MAP to prove that, given a gamma process with a shape parameter that is a function of Brownian motion, the resulting lifetime is distributed according to the Weibull distribution.
Kharoufeh presents a compact transform expression for the failure distribution for wear processes of a component degrading according to a Markovian environment inducing state-dependent continuous linear wear by using the properties of a MAP and assuming the wear process to be temporally homogeneous and that the environmental process has a finite state space.
Notes
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